The regular spiral arrangement of various parts of biological objects (leaves, florets, etc.), known as phyllotaxis, could not find an explanation during several centuries. Some quantitative parameters of the phyllotaxis (the divergence angle being the principal one) show that the organization in question is, in a sense, the same in a large family of living objects, and the values of the divergence angle that are close to the golden number prevail. This was a mystery, and explanations of this phenomenon long remained “lyrical”. Later, similar patterns were discovered in inorganic objects. After a series of computer models, it was only in the XXI century that the rigorous explanation of the appearance of the golden number in a simple mathematical model has been given. The resulting pattern is related to stable fixed points of some operator and depends on a real parameter. The variation of this parameter leads to an interesting bifurcation diagram where the limiting object is the SL(2, Z)-orbit of the golden number on the segment [0,1]. We present a survey of the problem and introduce a multidimensional analog of phyllotaxis patterns. A conjecture about the object that plays the role of the golden number is given.

Translated title of the contributionМногомерное обобщение филлотаксиса
Original languageEnglish
Pages (from-to)153-160
Number of pages8
JournalCybernetics and Physics
Volume8
Issue number3
DOIs
StatePublished - 28 Nov 2019

    Scopus subject areas

  • Mathematics(all)
  • Control and Optimization
  • Artificial Intelligence
  • Signal Processing
  • Fluid Flow and Transfer Processes
  • Computer Vision and Pattern Recognition
  • Physics and Astronomy (miscellaneous)

    Research areas

  • Diophantine approximation, Golden number, Klein sail, Phyllotaxis

ID: 49394343